The lattices and Möbius functions of stable closed subrootsystems and Hyperplane complements for classical Weyl Groups.
The Limit Shape of Convex Lattice Polygons.
The linear control problem
The local theorem for monotypic tilings.
The lonely vertex problem.
The Lower and Upper Bound Problems for Cubical Polytopes.
The -colored composition poset.
The Magic World of Geometry - I. The Isoperimetric Problem.
The Maximum Number of Second Smallest Distances in Finite Planar Sets.
The maximum number of unit distances among points in dimension four.
The Maximum Number of Ways To Stab n Convex Nonintersecting Sets in the Plane Is 2n - 2*.
The maximum of the smallest maximal coordinate of the minimum vectors in 6-lattices equals 1.
The maximum piercing number for some classes of convex sets with the -property.
The Maximum Size of a Convex Polygon in a Restricted Set of Points in the Plane.
The Mayer-Vietoris and IC Equations for Convex Polytopes.
The mean of a maximum likelihood estimator associated with the Brownian bridge.
The mean surface area of the boxes circumscribed about a convex body
The minimal perimeter for confined deformable bubbles of equal area.
The minimum mean width translation cover for sets of diameter one.
The Minlos lemma for positive-definite functions on additive subgroups of
Let H be a real Hilbert space. It is well known that a positive-definite function φ on H is the Fourier transform of a Radon measure on the dual space if (and only if) φ is continuous in the Sazonov topology (resp. the Gross topology) on H. Let G be an additive subgroup of H and let (resp. ) be the character group endowed with the topology of uniform convergence on precompact (resp. bounded) subsets of G. It is proved that if a positive-definite function φ on G is continuous in the Gross topology,...